Integers

Exploring the world of positive and negative whole numbers and Zero.

Introduction to Integers

Integers expand our number system beyond just natural numbers. They include all the natural numbers (1, 2, 3...), their negatives (-1, -2, -3...), and zero (0).

Definition and Notation

The set of integers is denoted by the letter Z (from the German word "Zahlen," meaning numbers).

Z = {..., -3, -2, -1, 0, 1, 2, 3, ...}

Integers do NOT include fractions or decimals.

Types of Integers

  • Positive Integers: {1, 2, 3, ...} (Same as Natural Numbers)
  • Negative Integers: {..., -3, -2, -1}
  • Zero: 0 is strictly an integer. It is neither positive nor negative.

Number Line Representation

Integers can be represented on a number line.

  • Zero is at the center.
  • Positive integers are to the right of zero.
  • Negative integers are to the left of zero.

As you move to the right, numbers increase. As you move to the left, numbers decrease.
Example: -5 < -2 < 0 < 3

Properties of Addition and Subtraction

  • Closure: Adding or subtracting two integers always results in an integer. (e.g., 2 - 5 = -3, which is an integer). Note: Subtraction IS closed for integers (unlike natural numbers).
  • Commutative (Addition): a + b = b + a (e.g., -2 + 5 = 3 and 5 + (-2) = 3). However, subtraction is NOT commutative (5 - 2 ≠ 2 - 5).
  • Associative (Addition): (a + b) + c = a + (b + c).
  • Additive Identity: a + 0 = a.
  • Additive Inverse: For every integer 'a', there exists '-a' such that a + (-a) = 0.

Multiplication Rules

  • Positive × Positive = Positive
  • Negative × Negative = Positive
  • Positive × Negative = Negative
  • Negative × Positive = Negative

Practice Questions

Free Preview - 10 Questions

Test your understanding of Integers with these questions.

1 Which symbol denotes the set of integers?
  • A N
  • B Z
  • C Q
  • D W
Explanation:
The set of integers is denoted by Z (from the German word Zahlen).
2 Which of the following is NOT an integer?
  • A -10
  • B 0
  • C 2.5
  • D 5
Explanation:
Integers must be whole numbers (positive, negative, or zero). 2.5 involves a decimal/fraction, so it is not an integer.
3 What is the value of 5 + (-8)?
  • A 13
  • B 3
  • C -3
  • D -13
Explanation:
When adding a positive and a negative number, subtract the smaller absolute value from the larger one and keep the sign of the larger absolute value. | -8 | = 8, | 5 | = 5. 8 - 5 = 3. Since -8 has the larger absolute value, the result is -3.
4 Product of two negative integers is always:
  • A Positive
  • B Negative
  • C Zero
  • D Undefined
Explanation:
Multiplying two negative numbers results in a positive number (e.g., -2 × -3 = 6).
5 Zero is:
  • A Positive
  • B Negative
  • C Neither positive nor negative
  • D Both positive and negative
Explanation:
Zero is the neutral integer. It represents the absence of quantity and lies between positive and negative numbers.
6 Which is the smallest integer?
  • A 0
  • B -1
  • C -100
  • D Undefined (Infinite)
Explanation:
The set of integers extends infinitely in both negative and positive directions. There is no smallest integer.
7 What is the additive inverse of -7?
  • A -7
  • B 7
  • C 0
  • D 1/7
Explanation:
The additive inverse of a number 'a' is '-a' such that sum is 0. -7 + 7 = 0. So, 7 is the additive inverse.
8 Solve: -5 - (-3)
  • A -8
  • B -2
  • C -2
  • D 2
Explanation:
Subtracting a negative is the same as adding a positive. -5 - (-3) = -5 + 3 = -2.
9 Which statement is FALSE?
  • A Every natural number is an integer
  • B Every whole number is an integer
  • C Every integer is a whole number
  • D 0 is an integer
Explanation:
Negative integers (like -1, -2) are NOT whole numbers (whole numbers are {0, 1, 2...}). So statement C is false.
10 The absolute value of -15 is:
  • A 15
  • B -15
  • C 0
  • D Undefined
Explanation:
Absolute value represents the distance from zero on the number line, which is always non-negative. |-15| = 15.

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Integers - Exam Preparation Strategy

When studying Integers for your final board exams, it is critical to focus on the core concepts and fundamental formulas. Relying strictly on NCERT textbook solutions and practicing previous year questions (PYQs) is the proven methodology for scoring high marks. Avoid rote memorization and instead focus on the logical application of the theories presented in this chapter.

⚠️ Common Mistakes to Avoid

❓ Frequently Asked Questions

How can I quickly memorize the concepts of Integers?

The most effective way is to create short, handwritten revision notes and continuously test your knowledge using our interactive Mock Tests. Spaced repetition and active recall are much better than passive reading.

What type of questions are most commonly asked from Integers?

Board exams tend to favor conceptual application questions and direct formula-based derivations from the NCERT syllabus. Ensure you have solved every single exercise in the official textbook.

Is reading the NCERT book enough for this chapter?

Yes, the NCERT textbook is the absolute gold standard for board exams. However, to improve your speed and accuracy during the actual exam, you must supplement your reading by solving timed mock tests and objective questions.